Query complexity of sampling and small geometric partitions

Abstract

In this paper we study the following problem: Discrete partitioning problem (DPP): Let Fq Pn denote the n-dimensional finite projective space over Fq. For positive integer k ≤ n, let \ Ai\i=1N be a partition of (Fq Pn)k such that (1) for all i ≤ N, Ai = Πj=1k Aij (partition into product sets), (2) for all i ≤ N, there is a (k-1)-dimensional subspace Li ⊂eq Fq Pn such that Ai ⊂eq (Li)k. What is the minimum value of N as a function of q,n,k? We will be mainly interested in the case k=n.